Genomic classification of malignant melanoma based on patterns of gene copy number alterations

ABSTRACT

The invention is directed to methods and kits that allow for classification of malignant melanoma cells according to genomic profiles, and methods of diagnosing, predicting clinical outcomes, and stratifying patient populations for clinical testing and treatment using the same.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application claims priority to U.S. Application No. 61/110,308 filed on Oct. 31, 2008, the contents of which are herein incorporated by reference.

This application also incorporates by reference the application entitled METHODS FOR ASSEMBLING PANELS OF CANCER CELL LINES FOR USE IN TESTING THE EFFICACY OF ONE OR MORE PHARMACEUTICAL COMPOSITIONS, (Dimitri Semizarov, Xin Lu, Ke Zhang, and Rick Lesniewski, inventors; filed on Oct. 28, 2009, which claims priority to U.S. Application No. 61/110,281 filed on Oct. 31, 2008).

STATEMENT REGARDING FEDERALLY SPONSORED RESEARCH OR DEVELOPMENT

Not applicable.

REFERENCE TO MATERIAL ON A COMPACT DISC

Not applicable.

BACKGROUND OF THE INVENTION

1. Field of the Invention

The present invention relates to methods for defining genomic subgroups of tumors, cancer cell lines and subject samples related to malignant melanoma (MM). The present invention also relates to methods for assembling panels of tumors, cancer cell lines and subject samples according to genomic subgroups for use in testing the efficacy of one or more therapeutic interventions for administering to a subject.

2. Description of Related Art

Cancer is a disease of the genome characterized by substantial variability in clinical course, outcome, and therapy responsiveness. The main factor underlying this variability is the genetic heterogeneity innate to cancers. Individual tumors of the same histopathological subtype carry different aberrations in cellular DNA.

Cutaneous malignant melanoma is an extremely aggressive type of skin cancer with increasing incidence in the Western world (Tucker and Goldstein, 2003). Melanoma is a heterogeneous disease with an unpredictable clinical course and a potential for aggressive growth and resistance to the existing chemotherapeutic regimens. It is difficult to predict clinical outcome in individual melanoma patients because of the spectrum of clinical, morphologic, and cytologic changes and a lack of discrete stages (Onken et al., 2004; Weyers et al., 1999).

Improvements in cancer classification are crucial for anti-cancer drug discovery. Currently, pre-clinical models are selected based on their availability, adaptability to tumor formation in mice and growth in culture and other parameters, but they do not represent the genetic heterogeneity of the parent tumor. This leads to poor response in clinical trials to agents, which have shown excellent response in pre-clinical models.

The phenotypic diversity of melanoma tumors is accompanied by a corresponding diversity in gene copy number aberration patterns. Chromosomal aberrations are detrimental events associated with a number of developmental diseases and cancer. Amplifications and deletions of chromosomal regions occurring in somatic cells are believed to be one of the main factors leading to cancer. Systematic examination of gene copy number patterns in malignant melanoma might therefore serve as a foundation for a genomics-based molecular taxonomy of malignant melanomas. Recurrent chromosomal aberration of prognostic significance can be detected individually by classical cytogenetic analysis or fluorescent in situ hybridization (FISH) (Levsky and Singer, 2003). However, FISH analysis cannot detect the entire spectrum of genetic abnormalities as it only interrogates a limited set of chromosomal loci defined by the applied probe panel. A more advantageous diagnostic tool would be based on a refined classification of the disease. It would enable rational patient selection for treatment based on the genetic status of a subject's MM.

BRIEF SUMMARY OF THE INVENTION

In a first aspect, the invention is directed to methods for obtaining a database of malignant melanoma (MM) genomic subgroups, the method comprising the steps of:

(a) obtaining a plurality of m samples comprising at least one MM cell, wherein the samples comprise cell lines or tumors;

(b) acquiring a data set comprising copy number alteration information from at least one locus from each chromosome from each sample obtained in step (a);

(c) identifying in the data set samples contaminated by normal cells and eliminating the contaminated samples from the data set, wherein the identifying and eliminating comprises:

-   -   (1) applying a machine learning algorithm tuned to parameters         that represent the differences between tumor and normal samples         to the data;     -   (2) assigning a probability score for normal cell contamination         to each sample as determined by the machine learning algorithm;     -   (3) eliminating data from the data set for each sample scoring         50% or greater probability of containing normal cells;

(d) estimating a number of subgroups, r, in the data set by applying an unsupervised clustering algorithm using Pearson linear dissimilarity algorithm to the data set;

(e) assigning each sample in the data set to at least one cluster using a modified genomic Non-negative Matrix Factorization (gNMF) algorithm, wherein the modified gNMF algorithm comprises:

-   -   (1) calculating divergence of the algorithm after every 100         steps of multiplicative updating using the formula:

$\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$

wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set;

-   -   (2) stopping the algorithm if the divergence calculated in         step (e) (1) does not decrease by more than about 0.001% when         compared to the divergence calculated for the previous 100 steps         of multiplicative updating of the algorithm;     -   (3) randomly repeating the algorithm for a selected number of         runs and calculating a Pearson correlation coefficient matrix of         H for the each of run the algorithm using the formula:

$\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{s_{H_{,i}}s_{H_{,j}}}}} & (12) \end{matrix}$

wherein C is a correlation matrix, C_(i,j) is an row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j), i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (d);

-   -   (4) averaging the Pearson correlation coefficient matrices for         each run of the algorithm obtained from step (e)(3) to arrive at         an average correlation matrix;     -   (5) assigning tumors and cell lines in the data set into r         subgroups by applying a unsupervised clustering algorithm using         1 minus the average correlation matrix determined in step (e)(4)         and cutting the dendrogram into r clusters;

(f) applying a Cophenetic correlation, Bayesian Information Criterion or a combination thereof to provide a final number of clusters from the data set, wherein each final cluster defines a genomic subgroup for each tumor or cancer cell line sample; and

(g) optionally evaluating the stability of the final number of clusters selected in step (f) using a ten-fold stability test.

In a second aspect, the invention is directed to methods of classifying a MM tumor or cell line, comprising:

(a) providing a database, developed through a method comprising:

-   -   (i) obtaining a plurality of m samples comprising at least one         MM tumor or cell line;     -   (ii) acquiring a first data set comprising copy number         alteration information from at least one locus from each         chromosome from each sample obtained in step (i);     -   (iii) identifying in the first data set samples contaminated by         normal cells and eliminating the contaminated samples from the         first data set, wherein the identifying and eliminating         comprises:         -   (1) applying a machine learning algorithm tuned to             parameters that represent the differences between tumor and             normal samples to the data;         -   (2) assigning a probability score for normal cell             contamination to each sample as determined by the machine             learning algorithm;         -   (3) eliminating data from the first data set for each sample             scoring 50% or greater probability of containing normal             cells;     -   (iv) estimating a number of subgroups, r, in the data set by         applying an unsupervised clustering algorithm using Pearson         linear dissimilarity algorithm to the data set;     -   (v) assigning each sample in the data set to at least one         cluster using a modified genomic Non-negative Matrix         Factorization (gNMF) algorithm, wherein the modified gNMF         algorithm comprises:     -   (1) calculating divergence of the algorithm after every 100         steps of multiplicative updating using the formula:

$\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$

wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set;

-   -   (2) stopping the algorithm if the divergence calculated in         step (v) (1) does not decrease by more than about 0.001% when         compared to the divergence calculated for the previous 100 steps         of multiplicative updating of the algorithm;     -   (3) randomly repeating the algorithm for a selected number of         runs and calculating a Pearson correlation coefficient matrix of         H for each of run the algorithm using the formula:

$\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{s_{H_{,i}}s_{H_{,j}}}}} & (12) \end{matrix}$

wherein C is a correlation matrix, C_(i,j) is an row and j^(th) column in matrix C, H_(,i) and H_(,j) are an and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j),i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv);

-   -   (4) averaging the Pearson correlation coefficient matrices for         each run of the algorithm obtained from step (v)(3) to arrive at         an average correlation matrix;     -   (5) assigning tumors and cell lines in the data set into r         subgroups by applying a unsupervised clustering algorithm using         1 minus the average correlation matrix determined in step (v)(4)         and cutting the dendrogram into r clusters;     -   (vi) applying a Cophenetic correlation, Bayesian Information         Criterion or a combination thereof to provide a final number of         clusters from the data set, wherein each final cluster defines a         genomic subgroup for each tumor or cancer cell line sample; and     -   (vii) optionally evaluating the stability of the final number of         clusters selected in step (vi) using a ten-fold stability test.

(b) providing a sample suspected of containing MM cells,

(c) acquiring a second data set, Vsample, comprising copy number alteration information from the same at least one locus from step (ii); and

(d) classifying the sample from Vsample, by comparing Vsample to the clusters determined in steps (i)-(vii).

In a third aspect, the invention is directed to methods of classifying a therapeutic intervention for arresting or killing malignant melanoma (MM) cells, comprising:

(a) from a panel of MM cells classified according to genomic subgroups, selecting at least on MM cell line from each subgroup, wherein the panel is assembled from a method comprising:

-   -   (i) obtaining a plurality of m samples comprising MM cells;     -   (ii) acquiring a first data set comprising copy number         alteration information from at least one locus from each         chromosome from each sample obtained in step (i);     -   (iii) identifying in the first data set samples contaminated by         normal cells and eliminating the contaminated samples from the         first data set, wherein the identifying and eliminating         comprises:         -   (1) applying a machine learning algorithm tuned to             parameters that represent the differences between tumor and             normal samples to the data;         -   (2) assigning a probability score for normal cell             contamination to each sample as determined by the machine             learning algorithm;         -   (3) eliminating data from the first data set for each sample             scoring 50% or greater probability of containing normal             cells;     -   (iv) estimating a number of subgroups, r, in the data set by         applying an unsupervised clustering algorithm using Pearson         linear dissimilarity algorithm to the data set;     -   (v) assigning each sample in the data set to at least one         cluster using a modified genomic Non-negative Matrix         Factorization (gNMF) algorithm, wherein the modified gNMF         algorithm comprises:     -   (1) calculating divergence of the algorithm after every 100         steps of multiplicative updating using the formula:

$\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$

wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set;

-   -   (2) stopping the algorithm if the divergence calculated in         step (v) (1) does not decrease by more than about 0.001% when         compared to the divergence calculated for the previous 100 steps         of multiplicative updating of the algorithm;     -   (3) randomly repeating the algorithm for a selected number of         runs and calculating a Pearson correlation coefficient matrix of         H for the each of run the algorithm using the formula:

$\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{s_{H_{,i}}s_{H_{,j}}}}} & (12) \end{matrix}$

wherein C is a correlation matrix, C_(i,j) is an i^(th) row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j), i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv);

-   -   (4) averaging the Pearson correlation coefficient matrices for         each run of the algorithm obtained from step (v)(3) to arrive at         an average correlation matrix;     -   (5) assigning the samples in the data set into r subgroups by         applying a unsupervised clustering algorithm using 1 minus the         average correlation matrix determined in step (v)(4) and cutting         the dendrogram into r clusters;     -   (vi) applying a Cophenetic correlation, Bayesian Information         Criterion or a combination thereof to provide a final number of         clusters from the data set, wherein each final cluster defines a         genomic subgroup for each sample; and     -   (vii) optionally evaluating the stability of the final number of         clusters selected in step (vi) using a ten-fold stability test;     -   (viii) selecting at least one MM cell line from each cluster         selected in step (vi) and assembling into panels defined         according to genomic subgroups.

(b) contacting the at least one MM cell from each subgroup with the therapeutic intervention;

(c) assaying the effectiveness of the therapeutic intervention to arrest or kill the at least one MM cell from each subgroup;

(d) classifying the therapeutic intervention according to the determined effectiveness of the therapeutic intervention to arrest or kill the at least one MM cell line from each subgroup, wherein arresting or killing the at least one MM cell line from one subgroup, but not another indicates specificity of the therapeutic intervention to arrest or kill MM cells of that subgroup. The therapeutic intervention can be chemotherapy, biological response modifiers, vaccine immunotherapy, or biochemotherapy. If the therapeutic intervention is a biological response modifier, it can be a pharmaceutical composition comprising an active agent, such as interferon, interleukin-2, monoclonal antibodies, and tumor necrosis factor-alpha, or combinations thereof.

In a fourth aspect, the invention is directed to methods of assembling a probe panel for classifying a MM cell from a sample, comprising:

(a) assembling a database, comprising:

-   -   (i) obtaining a plurality of m samples comprising at least one         MM cell;     -   (ii) acquiring a first data set comprising copy number         alteration information from at least one locus from each         chromosome from each sample obtained in step (i);     -   (iii) identifying in the first data set samples contaminated by         normal cells and eliminating the contaminated samples from the         first data set, wherein the identifying and eliminating         comprises:         -   (1) applying a machine learning algorithm tuned to             parameters that represent the differences between tumor and             normal samples to the data;         -   (2) assigning a probability score for normal cell             contamination to each sample as determined by the machine             learning algorithm;         -   (3) eliminating data from the first data set for each sample             scoring 50% or greater probability of containing normal             cells;     -   (iv) estimating a number of subgroups, r, in the data set by         applying an unsupervised clustering algorithm using Pearson         linear dissimilarity algorithm to the data set;     -   (v) assigning each sample in the data set to at least one         cluster using a modified genomic Non-negative Matrix         Factorization (gNMF) algorithm, wherein the modified gNMF         algorithm comprises:     -   (1) calculating divergence of the algorithm after every 100         steps of multiplicative updating using the formula:

$\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$

wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set;

-   -   (2) stopping the algorithm if the divergence calculated in         step (v) (1) does not decrease by more than about 0.001% when         compared to the divergence calculated for the previous 100 steps         of multiplicative updating of the algorithm;     -   (3) randomly repeating the algorithm for a selected number of         runs and calculating a Pearson correlation coefficient matrix of         H for the each of run the algorithm using the formula:

$\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{s_{H_{,i}}s_{H_{,j}}}}} & (12) \end{matrix}$

wherein C is a correlation matrix, C_(i,j) is an i^(th) row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j),i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv);

-   -   (4) averaging the Pearson correlation coefficient matrices for         each run of the algorithm obtained from step (v)(3) to arrive at         an average correlation matrix;     -   (5) assigning tumors and cell lines in the data set into r         subgroups by applying a unsupervised clustering algorithm using         1 minus the average correlation matrix determined in step (v)(4)         and cutting the dendrogram into r clusters;     -   (vi) applying a Cophenetic correlation, Bayesian Information         Criterion or a combination thereof to provide a final number of         clusters from the data set, wherein each final cluster defines a         genomic subgroup for each tumor or cancer cell line sample; and     -   (vii) optionally evaluating the stability of the final number of         clusters selected in step (vi) using a ten-fold stability test.     -   (viii) selecting at least one sample from each cluster selected         in step (vi) and assembling into panels defined according to         genomic subgroups;

(b) analyzing the database of step (a) to determine characteristic copy number abnormalities for each subgroup;

(c) designing a plurality of probes based on the determined characteristic copy number abnormalities for each subgroup and assigning each probe to a genomic subgroup.

In a fifth aspect, the invention is directed to kits comprising a probe panel for classifying an MM tumor sample. The probes in the probe panel can be, for example, FISH probes.

In a sixth aspect, the invention is directed to kits for classifying a MM tumor sample, comprising:

(a) instructions to assemble a database, comprising instructions for:

-   -   (i) obtaining a plurality of m samples comprising at least one         MM cell;     -   (ii) acquiring a first data set comprising copy number         alteration information from at least one locus from each         chromosome from each sample obtained in step (i);     -   (iii) identifying in the first data set samples contaminated by         normal cells and eliminating the contaminated samples from the         first data set, wherein the identifying and eliminating         comprises:         -   (1) applying a machine learning algorithm tuned to             parameters that represent the differences between tumor and             normal samples to the data;         -   (2) assigning a probability score for normal cell             contamination to each sample as determined by the machine             learning algorithm;         -   (3) eliminating data from the first data set for each sample             scoring 50% or greater probability of containing normal             cells;     -   (iv) estimating a number of subgroups, r, in the data set by         applying an unsupervised clustering algorithm using Pearson         linear dissimilarity algorithm to the data set;     -   (v) assigning each sample in the data set to at least one         cluster using a modified genomic Non-negative Matrix         Factorization (gNMF) algorithm, wherein the modified gNMF         algorithm comprises:     -   (1) calculating divergence of the algorithm after every 100         steps of multiplicative updating using the formula:

$\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$

wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set;

-   -   (2) stopping the algorithm if the divergence calculated in         step (v) (1) does not decrease by more than about 0.001% when         compared to the divergence calculated for the previous 100 steps         of multiplicative updating of the algorithm;     -   (3) randomly repeating the algorithm for a selected number of         runs and calculating a Pearson correlation coefficient matrix of         H for the each of run the algorithm using the formula:

$\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{s_{H_{,i}}s_{H_{,j}}}}} & (12) \end{matrix}$

wherein C is a correlation matrix, C_(i,j) is an row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j),i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv);

-   -   (4) averaging the Pearson correlation coefficient matrices for         each run of the algorithm obtained from step (v)(3) to arrive at         an average correlation matrix;     -   (5) assigning tumors and cell lines in the data set into r         subgroups by applying a unsupervised clustering algorithm using         1 minus the average correlation matrix determined in step (v)(4)         and cutting the dendrogram into r clusters;     -   (vi) applying a Cophenetic correlation, Bayesian Information         Criterion or a combination thereof to provide a final number of         clusters from the data set, wherein each final cluster defines a         genomic subgroup for each tumor or cancer cell line sample; and     -   (vii) optionally evaluating the stability of the final number of         clusters selected in step (vi) using a ten-fold stability test;         and

(b) optionally, a first, second, third, fourth, fifth and sixth cell line, or isolated genomic DNA thereof, wherein

the first cell line is selected from the group consisting of SKMEL119, HS944, WM1366, and WM88;

the second cell line is WM3248;

the third cell line is 1205LU;

the fourth cell line is selected from the group consisting of 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, and WM983C;

the fifth cell line is selected from the group consisting of WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, and 501MEL, and

the sixth cell lines is MALME3M or WM882.

In all aspects of the invention, the unsupervised clustering algorithm can be hierarchical clustering, Cophenetic correlation or Bayesian Information Criterion can be used, independently or together, to provide a final number of clusters from the data set.

In all aspects of the invention, the plurality of samples, m, can comprise a first, second, third, fourth, fifth and sixth cell lines, wherein

the first cell line is selected from the group consisting of SKMEL119, HS944, WM1366, and WM88;

the second cell line is WM3248;

the third cell line is 1205LU;

the fourth cell line is selected from the group consisting of 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, and WM983C;

the fifth cell line is selected from the group consisting of WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, and 501MEL, and

the sixth cell line is MALME3M or WM882.

In some aspects of the invention, the MM cells are from cell lines.

BRIEF DESCRIPTION OF SEVERAL VIEWS OF THE DRAWINGS

FIG. 1 shows a workflow of the genomics-based tumor classification procedure

FIG. 2 shows a dendrogram of the MM data set in order to derive the possible number of clusters generated by using hierarchical clustering.

FIG. 3 shows a heatmap of the MM tumor and cell line CGH data classified into 6 clusters. Each row represents a sample and each column represents a SNPs locus; red, white and blue colors indicate high, normal and low copy numbers, respectively; horizontal black lines separate different clusters; vertical spaces separate chromosome 1 to 22; cell lines are highlighted by green circles.

DETAILED DESCRIPTION OF THE INVENTION

The invention provides for assessing, classifying and stratifying MM tumors, as well as evaluating therapeutic intervention efficacy for MM tumors. The invention exploits microarray-based comparative genomic hybridization techniques to detect gene copy number abnormalities on a genome-wide scale, thus providing a whole-genome view of chromosomal aberrations accompanied by a change in the DNA copy number. Unlike previous histopathology-based classification schemes, the methods of the invention ascertain the genetic heterogeneity of MM cells, the main factor behind the observed variability in clinical interventions.

The methods of the invention allow for genomic sub-grouping of MM to facilitate discovery and development of targeted therapies against MM, as well as for defining discrete patient populations who harbor MMs that would be susceptible to these therapies. This stratification of patient groups is also extraordinarily useful in clinical trial design.

The subgroups defined by the clustering procedure of the invention carried distinct patterns of genomic aberrations, implying different origins and tumorigenic mechanisms. This observation suggests that the different subgroups will manifest distinct clinical behaviors and sensitivities to therapeutic interventions, characteristic of each subgroup. Such has been observed previously with other copy number aberrations, such as HER2 amplification in breast cancer, EGFR amplification in lung cancer, MYCN amplification in neuroblastoma. (see for example (Anand et al., 2003; Hirsch et al., 2006; Seeger et al., 1985; Vogel et al., 2002)).

The methods of the present invention, made possible by a novel computational algorithm, are based on the analysis of complex genome-wide patterns of copy number alterations. The methods of the invention provide for complete characterization of genomic subtypes of MM and generate more precise correlates of clinical behavior and therapeutic interventions.

The proposed genomic taxonomy is valid for the entire population of MM subjects because (i) the sample set was sufficiently large (˜110 samples), and (ii) the samples were acquired from a variety of sources, thus eliminating the possibility of bias.

In one aspect, then, the invention provides methods to profile MM samples using high-resolution comparative genomic hybridization (CGH) and methods to classify the copy number profiles using custom statistical algorithms. The resulting classification of MMs can be used to predict response of patients to drugs and select pre-clinical models.

The methods of the invention permit classification of MM based on patterns of genomic abnormalities, thus determining molecular subgroups of the disease.

In another aspect, the present invention exploits a unique computational algorithm that can be used to define or classify genomic subgroups of MM cells. Generally, the computational algorithm comprises the following steps:

1. Applying a machine learning algorithm (such as Random Forests) to identify and eliminate samples with significant contamination by normal cells;

2. Using unsupervised clustering (such as hierarchical clustering) to estimate the possible numbers of clusters before fitting the data with a genomic Non-negative Matrix Factorization (gNMF) model;

3. Using multiple random starts of gNMF followed by the application of the correlation of H matrix resulting from gNMF as the distance matrix to classify samples;

4. Classifying tumors and cancer cell lines into several possible numbers of clusters using the gNMF algorithm, followed by the use of the Cophenetic correlation coefficient and Bayesian Information Criterion (BIC) to select the best model and determine the final number of clusters; and

5. Optionally, applying a 10-fold stability test to evaluate the stability of the clusters.

In one embodiment, the invention classifies MM cells, comprising the steps of (1) extracting genomic DNA (gDNA) from MM cell samples; (2) hybridizing the gDNA to microarrays, and analyzing the microarrays to acquire the raw signal for each probe used in the microarray analysis; (3) determining the copy number of each locus and detecting copy number alteration regions; (4) performing data quality control; (5) smoothing copy number data and reducing dimensionality using a segmentation algorithm; (6) classifying the smoothed data using gNMF with an estimated number of clusters estimated by hierarchical clustering; (7) selecting the best classification model using Cophenetic correlation and/or Bayesian Information Criterion; and (8) optionally, testing the stability of the gNMF classification.

The methods of the present invention facilitate rational selection of preclinical testing models and improve the predictability of preclinical testing by providing a more complete representation of parent tumors in the panels of pre-clinical testing models. While not wishing to be bound by any theory, the fundamental principle of the present invention is as follows. Patterns of copy number alterations (CNAs) have been shown to determine the phenotypes of human tumors. Thus, if subgroups of tumor populations are defined by patterns of CNAs and then at least one cell line is selected to match each subgroup, a panel of cell lines can be developed that represents the diversity of the MM cell population more adequately than the presently available sets of models. These panels of cell lines can be used to test therapeutic interventions. Furthermore, these databases allow for patient MM tumors to be classified more finely, allowing for refined prescription of therapeutic interventions that have a higher probability of effectively treating the cancer.

The methods of the present invention facilitate rational selection of therapeutic interventions and preclinical testing models.

DEFINITIONS

A genome-wide copy number profile, or “copy number,” is a measurement of DNA copy number of more than one genetic locus. A copy number profile can assess if a cell is essentially wild-type, wherein each genetic locus is present in two copies (because of diploidy, except for sex chromosomes), or deviant from wild-type, i.e, containing amplifications and deletions of genetic loci. Amplifications and deletions can affect a part of an element, and entire element, or many elements simultaneously. A copy number profile does not necessarily determine the exact number of amplifications or deletions, but identifies those regions that contain the genetic abnormalities, and whether the abnormality is a deletion or amplification.

In some embodiments, a “wild-type” genome, when used in context of the genotype determination of a sample, does not necessarily mean the wild-type sample is strictly diploid. In the context of the present invention, a “wild-type” genome is one that is taken from a cell that does not express, or is not about to express, a particular disease state, such as MM. For example, a wild-type genome can be provided by a subject from healthy, normal cells, and compared to the same subject's MM cells.

“Bayesian Information Criterion” or “BIC” refers to a parametric method which is used as a statistical criterion for model selection. BIC was described by (Schwarz, 1978). BIC is defined by formula (1):

BIC=±2*ln L+k ln(n)  (1)

wherein L is the likelihood which measures how good the model approximates the data, k is the number of parameters used in the model, and n is the number of samples. The second term, k*ln(n), serves as a penalty on the number of parameters used in the model to avoid over-fitting.

“Cophenetic correlation coefficient” or “Cophenetic correlation,” used interchangeably, refers to algorithms that are used to measure how faithfully a dendrogram used to derive the final clustering result preserves the pair-wise distances between the original un-modeled data points. For use in the present invention, if it is supposed that the original data X_(i) has been modeled by a dendrogram distance measures are defined by formula (2):

x(i,j)=|X _(i) −X _(j)|  (2)

the distance between the i^(th) and j^(th) samples, and t(i,j)=the dendrogrammatic distance between the model points T_(i) and T_(j) where the distance is the height of the node at which these two points are first joined together.

Then, if x is the average of x(i,j), and t is the average t(i,j), the Cophenetic correlation coefficient c is defined by formula (3):

$\begin{matrix} {c = \frac{\sum\limits_{i < j}{\left( {{x\left( {i,j} \right)} - x} \right)\left( {{t\left( {i,j} \right)} - t} \right)}}{\sqrt{\left\lbrack {\sum\limits_{i < j}\left( {{x\left( {i,j} \right)} - x} \right)^{2}} \right\rbrack \left\lbrack {\sum\limits_{i < j}\left( {{t\left( {i,j} \right)} - t} \right)^{2}} \right\rbrack}}} & (3) \end{matrix}$

As r increases, the Cophenetic correlation will decrease dramatically at a certain point, thus corresponding to the best number of clusters (Carrasco et al., 2006; Maher et al., 2006).

“Cluster analysis,” also known as “data segmentation,” refers to the grouping or segmenting a collection of objects (also called observations, individuals, cases, or data rows) into subsets, subgroups or “clusters”, such that those within each cluster are more closely related to one another than objects assigned to different clusters. Central to all of the goals of cluster analysis is the notion of degree of similarity (or dissimilarity) between the individual objects being clustered. Examples of types of clustering are hierarchical clustering and k-means clustering.

“Hierarchical clustering” refers to the building (agglomerative), or break up (divisive), of a hierarchy of clusters. The traditional representation of this hierarchy is a dendrogram, with individual elements at one end and a single cluster containing every element at the other. Agglomerative algorithms begin at the leaves of the tree, whereas divisive algorithms begin at the root. Methods for performing hierarchical clustering are well known in the art.

Hierarchical clustering methods have been widely used to cluster biological samples based on their gene expression patterns and derive subgroup structures in populations of samples in biomedical research (Bhattacharjee et al., 2001; Hedenfalk et al., 2003; Sotiriou et al., 2003; Wilhelm et al., 2002). For example, hierarchical clustering has been used to group 64 human tumor cell lines into several clusters based on the expression pattern of 1161 selected genes, and derive the molecular signatures of different clusters (Ross et al., 2000).

“Machine learning” refers to a subfield of artificial intelligence that relates to the design and development of algorithms and techniques that allows computers to “learn”. In general, there are two types of learning: inductive, and deductive. Inductive machine learning methods extract rules and patterns out of data sets. The major focus of machine learning research is to extract information from data automatically, by computational and statistical methods. A number of machine learning algorithms, which are organized into taxonomies, based on the desired outcome of the algorithm, are known to those skilled in the art. These include (1) supervised learning (e.g., Random Forests); (2) unsupervised learning (e.g., principal components analysis, vector quantization, etc.); (3) semi-supervised learning; (4) reinforcement learning; (5) transduction; and (6) learning to learn.

“Non-negative Matrix Factorization” (NMF) refers to an algorithm for finding parts-based, linear representations of non-negative data. Non-negative Matrix Factorization was originally developed as a mathematical tool for use in image analysis (Lee and Seung, 1999; Lee and Seung, 2001). NMF was adopted in genomics for analysis of gene expression data (Brunet et al., 2004). Specifically, NMF was adapted for use in the analysis of gene copy number data, the variation of the method used for gene copy number analysis is referred to as genomic Non-negative Matrix Factorization (gNMF) (Carrasco et al., 2006; Maher et al., 2006). Given a n×m matrix V of smoothed copy number data for a set of samples, where n is the number of segments and m is the number of samples, the gNMF algorithm factorizes the matrix V into an n×r matrix W and a r×m matrix H as shown in formula (4):

V=W*H+e  (4)

wherein W can be viewed as the standard model for each subgroup; H as relative weights of each sample belonging to each subgroup; e represents the model fitting residues, and r is the number of subgroups to be clustered (which is usually much smaller than m). Given r and V as input, the gNMF algorithm first randomly sets the initial value of W and H, and then iteratively updates W and H using multiplicative update rules pursuant to formulas (5) and (6):

$\begin{matrix} \left. H_{\alpha\mu}\leftarrow{H_{\alpha\mu}\frac{\sum\limits_{i}{W_{i\; \alpha}{V_{i\; \mu}/({WH})_{i\; \mu}}}}{\sum\limits_{k}W_{k\; \alpha}}} \right. & (5) \\ \left. W_{i\; \alpha}\leftarrow{W_{i\; \alpha}\frac{\sum\limits_{\mu}{H_{\alpha \; \mu}{V_{i\; \mu}/({WH})_{i\; \mu}}}}{\sum\limits_{v}H_{\alpha \; v}}} \right. & (6) \end{matrix}$

wherein α runs from 1 to r, μ runs from 1 to m, and i runs from 1 to n.

“Pearson linear dissimilarity” refers to formula (7):

$\begin{matrix} {{d_{\rho}\left( {\overset{\rightarrow}{x},\overset{\rightarrow}{y}} \right)} = \frac{1 - {\rho \left( {\overset{\rightarrow}{x},\overset{\rightarrow}{y}} \right)}}{2}} & (7) \end{matrix}$

wherein {right arrow over (x)} and {right arrow over (y)} are two vectors with length n, ρ({right arrow over (x)}, {right arrow over (y)}) is the Pearson's linear correlation which has the formula (8):

$\begin{matrix} {{\rho \left( {\overset{\rightarrow}{x},\overset{\rightarrow}{y}} \right)} = {\frac{1}{n - 1}{\sum\limits_{i = 1}^{n}{\left( \frac{x_{i} - \overset{\_}{x}}{s_{x}} \right)\left( \frac{y_{i} - \overset{\_}{y}}{s_{y}} \right)}}}} & (8) \end{matrix}$

wherein the sample standard deviation s_(x) and s_(y) have formula (9):

$\begin{matrix} {s_{x} = \sqrt{\frac{\sum\limits_{i = 1}^{n}\left( {x_{i} - \overset{\_}{x}} \right)^{2}}{n - 1}}} & (9) \end{matrix}$

and wherein the sample mean has formula (10):

$\begin{matrix} {\overset{\_}{x} = {\frac{1}{n}{\sum\limits_{i = 1}^{n}{x_{i}.}}}} & (10) \end{matrix}$

“Random forests” refers to a supervised learning algorithm that uses a combination of tree predictors such that each tree depends on the values of a random vector sampled independently and with the same distribution for all trees in the forest (Breiman, 2001).

Random Forests grow many classification trees. To classify a new object from an input vector, put the input vector down each of the trees in the forest. Each tree gives a classification, and it is said that the tree “votes” for that class. The forest chooses the classification having the most votes (over all the trees in the forest). Each tree is grown as follows:

1. If the number of cases in the training set is n, sample n cases at random—but with replacement, from the original data. This sample will be the training set for growing the tree.

2. If there are m input variables, a number m<<M is specified such that at each node, m variables are selected at random out of the M and the best split on these m variables are used to split the node. The value of m is held constant during the forest growing.

3. Each tree is grown to the largest extent possible. There is no pruning

The forest error rate depends on two factors:

1. The correlation between any two trees in the forest. Increasing the correlation increases the forest error rate.

2. The strength of each individual tree in the forest. A tree with a low error rate is a strong classifier. Increasing the strength of the individual trees decreases the forest error rate.

An “oligonucleotide” or “polynucleotide” is a nucleic acid ranging from at least 2, preferable at least 8, and more preferably at least 20 nucleotides in length or a compound that specifically hybridizes to a polynucleotide. Polynucleotides include deoxyribonucleic acid (DNA) or ribonucleic acid (RNA). A further example of a polynucleotide is peptide nucleic acid (PNA).

A “probe” is a surface-immobilized molecule that can be recognized by a particular target.

“Solid support,” “support,” and “substrate” are used interchangeably and refer to a material or group of materials having a rigid or semi-rigid surface or surfaces.

“Hybridization” refers to the formation of complexes between nucleic acid sequences, which are sufficiently complementary to form complexes via Watson-Crick base pairing or non-canonical base pairing. For example, when a primer “hybridizes” with a target sequence (template), such complexes (or hybrids) are sufficiently stable to serve the priming function required by, e.g., the DNA polymerase, to initiate DNA synthesis. Hybridizing sequences need not have perfect complementarity to provide stable hybrids. In many situations, stable hybrids form where fewer than about 10% of the bases are mismatches. As used herein, the term “complementary” refers to an oligonucleotide that forms a stable duplex with its complement under assay conditions, generally where there is about 80%, about 81%, about 82%, about 83%, about 84%, about 85%, about 86%, about 87%, about 88%, about 89%, about 90%, about 91%, about 92%, about 93%, about 94% about 95%, about 96%, about 97%, about 98% or about 99% greater homology. Those skilled in the art understand how to estimate and adjust the stringency of hybridization conditions such that sequences having at least a desired level of complementarity stably hybridize, while those having lower complementarity will not. Examples of hybridization conditions and parameters are well-known (Ausubel, 1987; Sambrook and Russell, 2001).

A nucleic acid array (“array”) comprises nucleic acid probes attached to a solid support. Arrays typically comprise a plurality of different nucleic acid probes that are coupled to a surface of a substrate in different, known locations. These arrays, also described as microarrays, “chips” have been generally described in the art, for example, U.S. Pat. Nos. 5,143,854, 5,445,934, 5,744,305, 5,677,195, 6,040,193, 5,424,186 and (Fodor et al., 1991). These arrays can generally be produced using mechanical synthesis methods or light directed synthesis methods that incorporate a combination of photolithographic methods and solid phase synthesis methods. Techniques for the synthesis of arrays using mechanical synthesis are described in, e.g., U.S. Pat. No. 5,384,261. Although a planar array surface is preferred, the array can be fabricated on a surface of virtually any shape or even a multiplicity of surfaces. Arrays can be nucleic acids on beads, gels, polymeric surfaces, fibers such as fiber optics, glass or any other appropriate substrate; e.g., as described in U.S. Pat. Nos. 5,770,358, 5,789,162, 5,708,153, 6,040,193 and 5,800,992. Arrays can be packaged in such a manner as to allow for diagnostics or other manipulation of an all inclusive device, see for example, U.S. Pat. Nos. 5,856,174 and 5,922,591.

Arrays can be designed to cover an entire genome using single nucleotide polymorphisms (SNPs). For example, an array can cover 116,204 single-nucleotide polymorphism (SNP) loci in the human genome with a mean inter-marker distance of 23.6 kb SNP loci with a mean inter-marker distance of 23.6 kb loci.

“Labeled” and “labeled with a detectable label (or agent or moiety)” are used interchangeably and specify that an entity (e.g., a fragment of DNA, a primer or a probe) can be visualized, for example following binding to another entity (e.g., an amplification product). The detectable label can be selected such that the label generates a signal that can be measured and which intensity is related to (e.g., proportional to) the amount of bound entity. A wide variety of systems for labeling and/or detecting nucleic acid molecules, such as primer and probes, are well-known. Labeled nucleic acids can be prepared by incorporating or conjugating a label that is directly or indirectly detectable by spectroscopic, photochemical, biochemical, immunochemical, electrical, optical, chemical or other means. Suitable detectable agents include radionuclides, fluorophores, chemiluminescent agents, microparticles, enzymes, colorimetric labels, magnetic labels, haptens and the like.

“Probe” refers to an oligonucleotide designed for use in connection with a CGH microarray, a SNPs microarray or any other microarrays known in the art that are capable of selectively hybridizing to at least a portion of a target sequence under appropriate conditions. In general, a probe sequence is identified as being either “complementary” (i.e., complementary to the coding or sense strand (+)), or “reverse complementary” (i.e., complementary to the anti-sense strand (−)). Probes can have a length of about 10-100 nucleotides, preferably about 15-75 nucleotides, most preferably from about 15-50 nucleotides.

“Pharmaceutical composition” or “drug,” used interchangeably, refers to any agent, whether a small molecule (e.g., a drug containing an active agent, typically a non-peptidic) or biologic (e.g., a peptide, protein or antibody based drug, including any with modifications, such as PEGylation) that can be used to treat a subject or patient suffering from at least one type of cancer.

A “cell” can come from a tumor, cell line, or a subject.

A “therapy” or “therapeutic regimen” refers to a course of treatment intended to reduce or eliminate the affects or symptoms of a disease or to prevent progression of a disease from one state to a second, more detrimental state. A therapeutic regimen can comprise a prescribed drug, surgery or radiation treatment. The copy number profile of a subject's tumor can also impact side effects and efficacy of a selected therapy. In the present invention, the copy number profile of a subject's tumor can be used to determine a therapy or therapeutic regimen that is likely to be most effective.

“Subject” or “patient” encompasses mammals and non-mammals. Examples of mammals include: humans, other primates, such as chimpanzees, and other apes and monkey species; farm animals such as cattle, horses, sheep, goats, swine; domestic animals such as rabbits, dogs, and cats; laboratory animals including rodents, such as rats, mice and guinea pigs. Examples of non-mammals include birds and fish.

“Treat,” “treating” and “treatment,” mean alleviating, abating or ameliorating a disease or condition symptoms, preventing additional symptoms, ameliorating or preventing the underlying metabolic causes of symptoms, inhibiting the disease or condition, e.g., arresting the development of the disease or condition, relieving the disease or condition, causing regression of the disease or condition, relieving a condition caused by the disease or condition, or stopping the symptoms of the disease or condition either prophylactically and/or therapeutically.

Practicing the Invention

In the methods of the invention, a reference database of copy number profiles is created, wherein the genomic copy number in a plurality (m) of samples comprising MM cells is determined (where m is an integer from 1 to 5,000,000. For example, a plurality of samples can be two (2), five (5), ten (10), fifteen (15), twenty (20), twenty-five (25), fifty (50), one hundred (100), two hundred (200), five hundred (500) one thousand (1,000), ten thousand (10,000), fifty thousand (50,000), one hundred thousand samples (100,000), two hundred and fifty thousand samples (250,000), five hundred thousand (500,000), one million (1,000,000) samples, etc.). The MM cells are then classified into genomic subgroups according to the patterns of copy number, the copy number profile. Each one of these subgroups represents not only a classification based on genotype, but is expected to show characteristic responsiveness to various therapeutic interventions. For example, one subgroup may be more susceptible to radiation, while another is more susceptible to pharmaceutical interventions, such as chemotherapy.

Copy number alterations are detected in MM cells that can be obtained from subjects suffering from, or at risk for suffering from, MM. Such cells can be obtained using routine techniques. For example, tumors can be surgically dissected from a subject suffering or suspected of suffering from cancer and them immediately frozen, such as at −80° C.

For developing a database of different subgroups that allow for the classification of a subject, MM tumors and cancer cell lines can be obtained commercially or from public sources. A useful set of cell lines is shown in Table 1. In the table, ATTC, American Type Culture Collection (Manassus, Va.), CLS, Cell Line Service (Germany), and DSMZ, Deutsche Sammlung von Mikroorganismen and Zellkulturen GmbH (Braunschweig, Germany).

Additional copy number and copy number alteration information from MM cells and cancer cell lines can be obtained from a number of commercially or publically available sources, such as from the Gene Expression Omnibus (GEO), which is available from the National Center for Biotechnology Information (NCBI), Broad Institute/Dana Farber Cancer Institute internet Portal, on-line from the Dana Farber Cancer Institute web site, etc.

TABLE 1 Cells and sources ATCC catalog Cell Line Source of data number Reference SKMEL19 Broad Institute/Dana Farber (Lin et al., 2008) Cancer Institute (Broad) SKMEL30 Broad (Lin et al., 2008) SKMEL63 Broad (Lin et al., 2008) SKMEL119 Broad (Lin et al., 2008) HS944 Broad CRL-7693 (Lin et al, 2008) WM1366 Gene Expression Omnibus (Greshock et al., (GEO) 2007) WM88 GEO (Greshock et al., 2007). WM3248 GEO (Greshock et al., 2007). 1205Lu GEO CRL-2812 (Greshock et al., 2007). WM35 GEO CRL-2807 (Greshock et al., 2007). WM983 GEO (Greshock et al., 2007). WM3211 GEO (Greshock et al., 2007). M14 GEO (Greshock et al., 2007). Malme-3M GEO HTB-64 (Greshock et al., 2007). MeWo GEO HTB-65 (Greshock et al., 2007). SKMEL2 GEO (Greshock et al., 2007). SKMEL28 GEO (Greshock et al., 2007). SKMEL5 GEO (Greshock et al., 2007). UACC257 GEO (Greshock et al., 2007). UACC62 GEO (Greshock et al., 2007). WM122 GEO (Greshock et al., 2007). WM13662 GEO (Greshock et al., 2007). WM239A GEO (Greshock et al., 2007). WM32112 GEO (Greshock et al., 2007). WM32482 GEO (Greshock et al., 2007). WM793B GEO CRL-2806 (Greshock et al., 2007). WM882 GEO (Greshock et al., 2007). WM983C GEO (Greshock et al., 2007). 451Lu GEO CRL-2813 (Greshock et al., 2007). 501MEL GEO (Greshock et al., 2007).

Once the tumors and cancer cell lines are obtained, genomic DNA (gDNA) is extracted from each of the tumors or cell lines using routine techniques, such as, phenol-chloroform extraction, salting out, digestion-free extraction or by the use of commercially available kits, such as the DNEasy® or QIAAMP® kits (Qiagen, Valencia, Calif.). The gDNA obtained from each of the tumors or cell lines can then be modified or altered to facilitate analysis. For example, primer or adaptor sequences can be ligated to gDNA using routine techniques. For example, the gDNA can first be digested with a restriction endonuclease, such as HindIII or XbaI. Once digested, one or more primer or adapted sequences can be ligated to the digested gDNA. Preferably, the adaptors are those that recognize cohesive four base-pair overhangs.

The isolated DNA is amplified using routine methods. Useful nucleic acid amplification methods include the Polymerase Chain Reaction (PCR). PCR is described in a number of references (Innis, 1990; Innis et al., 1995; McPherson et al., 1991; Saiki et al., 1986; Sninsky et al., 1999); and U.S. Pat. Nos. 4,683,195, 4,683,202 and 4,889,818, each of which is incorporated herein by reference. Variations of PCR including TAQMAN®-based assays (Holland et al., 1991), and reverse transcriptase polymerase chain reaction (RT-PCR; described in, for example, U.S. Pat. Nos. 5,322,770 and 5,310,652, each of which is incorporated by reference).

Generally, a pair of primers is added to the isolated gDNA to hybridize to the complementary strands of the target nucleic acid. If the gDNA obtained from the tumors or cancer cell lines is digested and ligated to primer or adaptor sequences, then it is preferred that one of the primers used in the amplification method recognize the adaptor sequences. It is also preferred that the primers used in the amplification method amplify fragments in the 250 to 2000 base pair size range.

Upon completion of the amplification, the resulting amplified DNA is purified, using routine techniques, such as MINELUTE® 96 UF PCR Purification system (Qiagen). After purification, the amplified DNA is then fragmented using routine techniques, such as sonication or enzymatic digestion, such as DNase I. After fragmentation, the DNA is labeled with a detectable label. Methods for labeling DNA and fragments of DNA are well-known.

Any of a wide variety of detectable labels can be used. Suitable detectable labels include, but are not limited to, various ligands, radionuclides (e.g. ³²P, ³⁵S, ³H, ¹⁴C, ¹²⁵I, ¹³¹I, and the like); fluorescent dyes; chemiluminescent agents (e.g., acridinium esters, stabilized dioxetanes, and the like); spectrally resolvable inorganic fluorescent semiconductor nanocrystals (e.g., quantum dots), metal nanoparticles (e.g., gold, silver, copper and platinum) or nanoclusters; enzymes (e.g., horseradish peroxidase, beta-galactosidase, luciferase, alkaline phosphatase); colorimetric labels (e.g., dyes, colloidal gold, and the like); magnetic labels (e.g., DYNABEADS™); and biotin, dioxigenin or other haptens and proteins.

Once the amplified, fragmented DNA is labeled with a detectable label, it is hybridized to a microarray using routine techniques. The microarray can contain oligonucleotides, genes or genomic clones that can be used in Comparative Genomic Hybridization (CGH) to look for genomic gains and losses. Alternatively, the microarray can contain oligonucleotides or genomic clones that detect mutations or polymorphisms, such as single nucleotide polymorphisms (SNPs). Microarrays can be made using routine techniques known in the art. Alternatively, commercially available microarrays can be used. Examples of microarrays that can be used are the AFFYMETRIX® GENECHIP® Mapping 100K Set SNP Array (Matsuzaki et al., 2004) (Affymetrix, Inc., Santa Clara, Calif.), the Agilent Human Genome aCGH Microarray 44B (Agilent Technologies, Inc., Santa Clara, Calif.), Illumina microarrays (Illumina, Inc., San Diego, Calif.), Nimblegen aCGH microarrays (Nimblegen, Inc., Madison, Wis.), etc.

After hybridization, the microarray is washed using routine techniques to remove non-hybridized nucleic acids. After washing, the microarray is analyzed in a reader or scanner. Examples of readers and scanners include GENECHIP® Scanner 3000 G7 (Affymetrix, Inc.), the Agilent DNA Microarray Scanner (Agilent Technologies, Inc.), GENEPIX® 4000B (Molecular Devices, Sunnyvale, Calif.), etc. Signals gathered from the probes contained in the microarray can be analyzed using commercially available software, such as those provided by Affymetrix or Agilent Technologies. For example, if the GENECHIP® Scanner 3000 G7 from Affymetrix is used, the AFFYMETRIX® GENECHIP® Operating Software can be used. The AFFYMETRIX® GENECHIP® Operating Software collects and extracts the raw or feature data (signals) from the AFFYMETRIX® GENECHIP® scanners that detect the signals from all the probes. The raw or feature data can be stored electronically in one of any suitable file formats, such as a CEL file (the format of the CEL file is an ASCII text file similar to the Windows INI format), a CHP file, a CNT file, a metaprobeset file or a plain text file.

The data collected and extracted from the microarray are processed to determine the copy number at each locus on each chromosome and to define regions of copy number alterations. Such processing can be done using known algorithms, such as Binary Circular segmentation (Olshen et al., 2004), Gain and Loss Analysis of DNA (GLAD) (Hupe et al., 2004), Hidden Markov Model-based approaches (Fridlyand et al., 2004; Zhao et al., 2004), or clustering methods (Wang et al., 2005), etc. Alternatively, commercially available software can be used, such as, the PARTEK® GENOMIC SUITE™ software, such as version 6.08.0103 (available from Partek, St. Louis, Mo.), GenePattern (available on-line; (Reich et al., 2006)), and dChip (available on-line; (Li and Hung Wong, 2001; Li and Wong, 2001).

For example, if the PARTEK® GENOMIC SUITE™ software, such as version 6.08.0103 is used, CEL files containing the signals from all the probes in the microarray detected by the scanners can be loaded into the software. The copy numbers are calculated by comparing the signal intensities for the tumor or cancer cell line samples determined from the microarray to those in a reference or control after correction to a preset baseline (the number used to establish the preset baseline is not critical and is an integer (n), where n is 1 to 100. For example, the preset baseline can be 2). The reference or control used can be a set of normal tissue samples or paired normal tissues from the same patients as the tumor samples measured by the same microarray platform. The reference or control can comprise at least 5 samples, at least 10 samples, at least 15 samples, at least 20 samples, at least 25 samples, at least 30 samples, at least 35 samples, at least 40 samples, at least 45 samples, at least 50 samples, at least 75 samples, at least 100 samples, at least 150 samples, at least 200 samples, etc.

The resulting copy number data is then segmented, and copy number alteration regions are detected in each sample. The segmentation and detection of copy number alteration regions can be obtained using the following control parameters:

(i) a copy number region must contain at least 100 probes;

(ii) the p-value comparing the mean copy number of the copy number region versus the adjacent copy number regions must be less than 0.00001; and

(iii) the signal/noise ratio of the transition must be greater than 0.1.

The copy number alteration regions can be detected when the mean copy numbers in these regions is statistically less than 1.65 (deletion) or greater than 2.65 (gain) with P values below 0.01.

Because tumor samples can contain a significant percentage of normal cells which can dilute the signal of a copy number alteration, a machine learning algorithm can be used to capture the difference between the copy number patterns of tumor and cancer cell line samples and those of normal samples. Such an algorithm can be used to identify and eliminate tumor samples contaminated by normal cells from further analysis. Thus, this algorithm serves as a data quality control and is referred to as a “data quality control algorithm.”

The data quality control algorithm involves selecting a subset of samples with the highest number of copy number alteration regions from the tumor and cancer cell line samples as previously described herein (hereinafter the “first sample set”). A normal set of samples is also selected (hereinafter “the second sample set”). These first and second sample sets are used as a training set to develop a machine learning algorithm to classify samples as either being “normal” or “tumor” samples by tuning the parameters of the algorithm to best represent the difference between first and second sample set. The trained classifier is applied to the remaining tumor or cancer cell line samples to assign a score to each sample. This score represents the probability of each sample being contaminated by normal cells. Samples having a contamination probability over 50% are excluded from the subsequent clustering analysis. Machine learning algorithms that can be used for this purpose, include Random Forests (RF) (Breiman, 2001), Support Vector Machine (SVM) (Vapnik, 1995), Recursive-SVM (Zhang et al., 2006), Least-angle regression (LARS) (Efron et al., 2004), etc.

Because copy number data obtained from microarrays tend to be highly dense and noisy, the copy number data can be smoothed to decrease noise level, and reduce dimensionality (also referred to as “dimension reduction”) and data complexity. Data smoothing can be done by first detecting significantly gained or deleted copy number regions in each sample using routine techniques. Once such regions are identified, adjacent regions can be merged if they have similar copy number changes and if the distances between these regions are less than 500 kilobases. Then the entire genome can be segmented using the union of break points from all samples in a data set, and the copy number of each segment can be calculated by averaging the copy number of SNPs probes within each segment (Carrasco et al., 2006). Data smoothing can give better resolution of copy number gains and deletions from each sample.

After data smoothing and dimension reduction, the data set is subjected to an unsupervised clustering method to obtain an overview of the relative similarity between each of the tumor and cancer cell line samples and to obtain an estimate (e.g., a rough estimate) of the number of subgroups (which is also referred to herein as r subgroups) that exist in the data thus far. After data smoothing and dimension reduction, unsupervised clustering methods using the Personal linear dissimilarity algorithm are applied to the smoothed tumor and cell line copy number dataset which is referred to as the “Data Set” or V. The clustering patterns can be plotted and visually inspected to derive a range of possible numbers of subgroups, r, in the Data Set (the range of possible numbers of subgroups in the Data Set will be an integer (n) from 1 to 100). Examples of unsupervised clustering methods that can be used include, but are not limited to, hierarchical clustering, Principal Components Analysis (PCA) (Pearson, 1901) or Multidimensional Scaling (MDS) (Borg and Groenen, 2005). The numbers of subgroups (which are each referred to as “r value”, where each r value is an integer from 1 to 100) are then used as input in the clustering analysis using genomic Non-negative Matrix Factorization (“gNMF”).

In previous applications of gNMF to cluster CGH data (Carrasco et al., 2006; Maher et al., 2006), the algorithm was stopped when the subgroup assignments of tumor or cancer cell line samples did not change after a pre-defined number of steps (e.g., 100). Based on tests with simulated data as well as actual CGH data, it is believed that this criterion stops (e.g., terminates) the gNMF algorithm too early. Therefore, the gNMF algorithm can be modified so that after a selected number of steps (where the selected number of steps is not critical and is an integer (n) from 1 to 1000, such as, for example, 5 steps, 10 steps, 25 steps, 50 steps, 100 steps, 200 steps, etc.) of multiplicative updating, the divergence of the algorithm from the Data Set is calculated using formula (11):

$\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \; \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$

wherein the V_(ij) the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set.

Using the above formula, the iterative algorithm stops (also referred to herein as the “stop criterion”) if the divergence calculated above does not decrease by more than about 0.001% when compared to the divergence calculated for the previous or prior selected number of steps (for example, 100) of multiplicative updating for the algorithm. This modification to the gNMF algorithm has been found to significantly improve the accuracy of the clustering.

Because gNMF is a stochastic procedure, the algorithm can generate different outcomes when started from different initial values. To further improve the performance of the clustering algorithm, a new multiple initiation strategy was developed. For each Data Set, the strategy involves using the above described stop criterion and randomly starting or repeating the gNMF algorithm for a select number of runs (the select number of runs that the algorithm can be randomly started or repeated and is an integer (n) from 1 to 1000, such as for example, 1, 5, 10, 15, 20, 25, 30, 35, 40, 45, 50, 55, 60, 65, 70, 75, 80, 85, 90, 95, 100, 125, 150, 175, 200, 225, 250, 275, 300, 350, etc). Once the algorithm has completed its randomly selected number of runs, the Pearson correlation coefficient matrix of H for the each of these run is calculated using formula (12):

$\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{S_{H_{,i}}S_{H_{,j}}}}} & (12) \end{matrix}$

wherein C is the correlation matrix, C_(i,j) is the i^(th) row and j^(th) column in the matrix C, H_(,i) and H_(,j) are the i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is the Pearson correlation coefficient between H_(,i) and H_(,j), i and j run from 1 to m and m is the number of samples in the data set, k runs from 1 to r and r is the number of subgroups (determined previously herein). Once the Pearson correlation coefficient matrix of H for each run is determined, the correlation matrices are averaged. The final clustering result can be derived by running an unsupervised clustering method (e.g., such as a hierarchical clustering algorithm) using 1 minus the average correlation matrix as the distance matrix and cutting the dendrogram into r subgroups.

For example, if the gNMF algorithm is randomly run 200 times, after the 200 runs, the Pearson correlation coefficient matrix of H from the output of each of the 200 random gNMF runs is calculated using the above described formula. Then the correlation matrices over the 200 runs are then averaged. The final clustering result can be derived by running a hierarchical clustering algorithm using 1 minus the average correlation matrix as the distance matrix and cutting the dendrogram into r subgroups.

Once the final clustering result is obtained, Cophenetic correlation coefficient, Bayesian Information Criterion (BIC) or a combination of the Cophenetic correlation and BIC is then used to select the best model (namely, the best number of clusters and the best assignment of each sample into one of the clusters) most reflective of the distribution of the genetic patterns of these tumor and cell line samples. Lognormal distribution can be used in this analysis as it is widely used to fit DNA copy numbers (Hodgson et al., 2001). To calculate the likelihood, it can be assumed that samples in each cluster came from the same multi-lognormal distribution where the mean copy number of each segment followed a lognormal distribution. If the correlation between segments is weak, independence can be assumed between segments in the calculation. In this instance, the resulting log-likelihood formula (13) is:

$\begin{matrix} {{\ln \; L} = {\frac{1}{2}{\ln \left( {2\pi} \right)}{\sum\limits_{i = 1}^{r}{\sum\limits_{j = 1}^{n_{i\;}}{\sum\limits_{t = 1}^{m}{\frac{\left( {y_{ijt} - \mu_{it}} \right)^{2}}{2\sigma_{it}^{2}}{\ln \left( \sigma_{ij} \right)}}}}}}} & (13) \end{matrix}$

where r is the number of clusters, n_(i) is the number of samples in cluster i, m is the number of segments, y_(ijt) is the log transformed copy number of the t^(th) segment of the j^(th) sample in the i^(th) cluster, μ_(it) is the average of log transformed copy numbers of the t^(th) segment in the i^(th) cluster, and σ_(it) is the standard deviation of log transformed copy numbers of the t^(th) segment in the i^(th) cluster. Then the number of parameters, k, in the specified model would be 2×r×m.

Many times, when using both Cophenetic correlation coefficient and BIC as a criterion to select the best model in unsupervised clustering, these two algorithms will often select the same model.

A 10-fold stability test procedure can be used to assess the stability of the clustering results. The 10-fold stability test can be performed as follows. After running gNMF on the data set and assigning the samples to clusters, at least about 10% of the tumor and cancer cell line samples are left out and the modified gNMF algorithm described above is run a second time on the remaining 90% of the tumor and cancer cell line samples (if at least about 15% of the tumor and cancer cell line samples are left out then the gNMF algorithm described above would be run a second time on the remaining 85% of the tumor and cancer cell line samples, etc.). The number of samples assigned to a different cluster as a result of this permutation is then calculated. The test is repeated a selected number of times (the test can be repeated from 1 to 1000 times. For example, the test can be repeated, 1 time, 20 times, 25 times, 50 times, 100 times, 200 times, 500 times, 750 times, 1000 times, etc.) to derive an error rate using routine techniques known in the art. This error rate represents the stability of the clustering result with respect to the permutation of the tumor and cancer cell line samples. This 10-fold stability test can be used on unsupervised clustering methods (e.g., hierarchical clustering) using the same data sets (the tumor and cancer cell line samples).

Using these methods, tumors harboring MM cells and MM cell lines can be classified into genomic subgroups. First, a sufficient number of MM tumors and MM cell lines are clustered into distinct subgroups using the methodology described above. From each of these subgroups, at least one cell line from each of subgroup is selected and added to the panel, with each panel thus comprising a genomic subgroup. The resulting panel thus adequately represents all genomic subtypes of MM. This panel can be used as pre-clinical models for pharmaceutical composition or drug testing for MM, thus providing comprehensive coverage of the genomic diversity of the tumor type under consideration.

Applications

Having a diagnostic panel assembled allows for increased sensitivity for MM diagnosis. Not only can a subject now be diagnosed for MM, but the subject can also be diagnosed for a “genomic type” of MM based on the classification of the subject's MM genotype in the classification panel. In this way, targeted therapeutic interventions can be administered that increase the success of treatment and improve the quality of life for a subject.

In diagnostic methods of the invention, a sample suspected of containing at least one MM cell is obtained. The cells in the sample are then subjected to microarray analyses, using the same probes and parameters that are used to establish the original diagnostic panel, or any other set of probes and parameters that can detect copy number alterations, and the data set from the microarray analyses is processed so as to determine which subgroup the subject's MM genotype resembles. The subject's MM genotype is then assigned to that subgroup.

From the subgroup information, therapeutic intervention and trials can be designed. For example, as data becomes available on treatment success as related to MM genotypes, a subject can be administered those treatments that have the highest probability of treating MM based on the subjects MM genotype and subgroup classification. In this way, trail-and-error treatment is greatly diminished, as is reliance on the most invasive treatments (surgeries), and the subject has a better chance of both remission and a higher quality of life during treatment. The subject's quality of life improves because treatment periods and the number of therapeutic interventions are decreased.

If treatments are not established, therapeutic interventions can be determined by using the cell panel data. For example, if cell lines S, K, I, and N fall into a single subgroup, they can be subjected to in vitro tests of various therapeutic options for potentially efficacy. Those therapeutic interventions that are effective in having an adverse effect on the most cell lines in a cluster represent those interventions most likely to effectively treat the subject.

Therapeutic interventions for MM include for those melanomas that have not spread beyond the site at which they developed is surgical excision with margins proportional to the microstage of the primary lesion; for most lesions 2 mm or less in thickness, this means 1 cm radial re-excision margins.

Treatment of melanomas with a Breslow thickness of 2 mm or more is usually surgical excision with margins based on Breslow thickness and anatomic location. For most melanomas more than 2 mm to 4 mm in thickness, this means 2 cm to 3 cm radial excision margins. Subjects with melanomas that have a Breslow thickness more than 4 mm are usually considered for adjuvant therapy with high-dose interferon.

Some melanomas that have spread to regional lymph nodes may be treated with wide local excision of the primary tumor and removal of the involved regional lymph nodes. Adjuvant high-dose interferon can increase survival. Currently available adjuvant chemotherapy does not usually improve survival.

Melanoma that has spread to distant sites is difficult to treat with standard therapy, though high-dose interleukin-2 (IL-2) can produce responses in some subjects. Other treatments include combination chemotherapy, biological response modifiers (such as specific monoclonal antibodies, interferons, IL-2, or tumor necrosis factor-alpha), vaccine immunotherapy, or biochemotherapy (chemoimmunotherapy).

Representative cell lines and tumor samples can be subjected to an in vitro test assaying the ability of a therapeutic intervention to treat MM. For example, the cell lines can be assayed for their susceptibility to the various chemotherapy agents, singly and in combinations. When a plurality of cell lines responds similarly to one or more interventions, then those are selected for administration to the subject. Thus, the cell panels can be augmented by in vitro, and eventually, real-world treatment data, providing a therapeutic matrix based on MM copy number profiles.

In another embodiment, the methods of the invention are directed to assembling a probe panel for classifying MM cells. The database of genomic sub-groups is analyzed for most characteristic copy number abnormalities for each subgroup, and probes are designed to detect those regions. The probes can be a subset of the probes used in the original microarray analysis procedure, or designed and optimized for particular characteristics. In one embodiment, such probes are FISH probes. In another embodiment, such probe panels are provided in kits.

In other embodiments, kits are provided for classifying a MM cell that contains, for example, instructions for assembling a database that classifies MM cells by genomic subgroup and at least a first, second, third, fourth, fifth and sixth cell line, or isolated genomic DNA thereof, wherein each cell line or gDNA represents a genomic subgroup. For example, the first cell line or gDNA can be SKMEL119, HS944, WM1366, WM88; the second cell line can be WM3248; the third cell line can be 1205LU; the fourth cell line can be 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, or WM983C; the fifth cell line can be WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, or 501MEL, and the sixth cell line can be MALME3M or WM882.

Kits can include probe panels, as well as control cell lines or gDNA that are normal or not MM cells.

EXAMPLES

The following examples are for illustrative purposes only and should not be interpreted as limitations of the claimed invention. There are a variety of alternative techniques and procedures available to those of skill in the art which would similarly permit one to successfully perform the intended invention.

The methods of the invention directed to MM classification are summarized in FIG. 1.

Example 1 CGH Data of Cell Lines and Tumor Tissue Samples

The inventors gathered CGH data for 30 melanoma cell lines and 109 melanoma short-term cultures from various published sources (Greshock et al., 2007; Lin et al., 2008) to establish the melanoma classification model. The sources of cell lines used in this study are listed in Table 1. These data had been acquired using Affymetrix's GENECHIP® Mapping 250K STY SNP arrays, following the manufacturer's instructions.

Copy number data can also be acquired using other SNPs or CGH microarray platforms, such as other versions of AFFYMETRIX® SNPs microarrays, Agilent aCGH microarrays (Agilent, Inc., Santa Clara, Calif.), ILLUMINA® microarrays (Illumina, Inc., San Diego, Calif.), and NIMBLEGEN® aCGH microarrays (Nimblegen, Inc., Madison, Wis.).

Example 2 Step 2: Copy Number Determination and Detection of Copy Number Alterations

Genomic Suite software (version 6.08.0103) (Partek; St. Louis, Mo.) was used for low-level processing of the data to determine the copy numbers of each locus and define regions of copy number alteration. CEL files containing signals for all SNPs probes were loaded into the software, and copy numbers were calculated by comparing the signal intensities for tumor or cell line samples to those for a reference set of 90 normal female tissue samples, corrected to a baseline of 2. The reference set can also consist of other sets of normal samples, or paired normal tissues from the same patients of the tumor samples, measured by the same microarray platform.

The resulting probe-level copy number data were segmented, and the copy number alteration regions were detected in each sample. Specifically, probe-level copy numbers were segmented into regions using the following control parameters: (i) a region must contain at least 100 probes, (ii) the p-value comparing the mean copy number of the region versus the adjacent regions must be less than 0.00001, and (iii) the signal/noise ratio of the transition must be greater than 0.1. The copy number alteration regions were detected when the mean copy numbers in these regions were less than 1.65 (deletion) or greater than 2.65 (gain) with P values below 0.01.

The segmentation of copy number and detection of copy number alterations can also be achieved by other algorithms, such as the Binary Circular segmentation (Olshen et al., 2004), Gain and Loss Analysis of DNA (GLAD) (Hupe et al., 2004), Hidden Markov Model-based approaches (Fridlyand et al., 2004) (Zhao et al., 2004), or clustering methods (Wang et al., 2005), etc. These methods have been implemented in several software packages such as GenePattern (Reich et al., 2006) and dChip (Li and Hung Wong, 2001; Li and Wong, 2001).

Example 3 Step 3: Data Quality Control

Tumor samples may contain a significant percentage of normal cells that dilute the signal of copy number alteration present in the tumor cells. A machine learning algorithm to capture the difference between copy number patterns of tumor and normal samples was developed and then used to identify and eliminate normal contaminated samples from further analyses. First, a subset of samples with the highest number of copy number alteration regions and a set of normal samples were selected. These two groups of samples were used to train a machine learning algorithm (Random Forest: RF (Breiman, 2001)) to classify normal and tumor samples by tuning the parameters to best represent the difference between tumor and normal samples. Second, the trained classifier algorithm was applied to the rest of samples; the classifier assigned a score to each sample, where the score represented the probability of the sample being contaminated by normal cells. Samples that had a probability score of over 50% normal cell contamination were excluded from clustering analysis.

Example 4 Step 4: Data Smoothing and Dimension Reduction

The density of copy number data obtained by SNPs microarrays was high and there was a significant amount of noise. Consequently, copy number data was smoothed to reduce noise, dimensionality and complexity of the clustering analysis. After detecting significantly gained or deleted regions in each sample, adjacent regions were merged if they had similar copy number changes and the distance between them was less than 500 kb. The DNA segments were formed by using the union of break points from all samples in a data set. The average copy number of probes within each segment was used for further analysis. This step allowed for a clearer resolution of DNA gains and deletions in the high-throughput analysis.

Example 5 Step 5: Pilot Clustering Analysis Using Hierarchical Clustering to Determine the Possible Number of Subgroups

For each data set, the inventors hierarchically clustered the tumor and cell line CGH data using Pearson dissimilarity (defined as (1−r)/2, where r is the Pearson correlation). The hierarchical clustering patterns were plotted and visually inspected to derive a range of possible numbers of subgroups in the dataset. These numbers were then used as input in the clustering analysis using genomic Non-negative Matrix Factorization.

Example 6 Step 6: gNMF Clustering of the Tumor and Cell Line CGH Data

The gNMF algorithm was used to classify the tumor and cell line CGH data, using cluster numbers in the range determined in step 5. With each cluster number, the gNMF algorithm was run 200 times using the stop criterion we developed. Classification models were then derived by hierarchical clustering on 1 minus the average of correlation matrix of H.

Example 7 Step 7: Model Selection Using Bayesian Information Criterion (BIC)

The above gNMF procedure was run with several possible r values (number of subgroups) chosen in the initial hierarchical clustering analysis, and several models with different numbers of subgroups were built. The Bayesian Information Criterion (BIC) were then used to select the best model (the number of subgroups and the assignment of each sample into one of the subgroups) that best reflects the distribution of the genetic patterns of these tumor and cell line samples.

BIC was used as a criterion to select the model that best reflects the distribution of the genetic patterns of these tumor and cell line samples in the unsupervised clustering. After choosing the best model, each of the melanoma tumor samples and cell lines was assigned to one of the genomic subgroups based on the model selected. Additional melanoma tumor samples profiled in the future can also be assigned to one of the subgroups based on their genomic pattern.

Example 8 Step 8: Ten-Fold Stability Test of Clustering Stability

A 10-fold stability test procedure was developed to assess the stability of the classification results. After running gNMF on a data set and assigning tumor and cell line samples to subgroups, 10% of samples were randomly left out, and the same procedure was applied to the remaining 90% of samples. The number of samples that were assigned to a different subgroup by this permutation was calculated. This leave-out test was repeated 200 times to derive an error rate, which represents the stability of the clustering result with respect to permutation of samples. The stability of hierarchical clustering using the same procedure for the same data sets was also assessed and found that it was always much higher than that of gNMF clustering.

Example 9 Results

Steps 1-2. The CGH data of the 139 mM tumor and cell line samples were processed as described in Examples 1 and 2. A total of 5616 segments with a significantly altered copy number were detected.

Step 3. The data quality control procedure was applied to the MM CGH data. Twenty-nine tumor samples were found to be significantly contaminated by normal cells. The remaining uncontaminated 80 tumor samples and the 30 cell lines were used for subsequent analysis.

Step 4. The dimensionality of the CGH data was reduced to 4637.

Step 5. Hierarchical clustering was used as initial analysis on the MM data set to estimate the number of clusters. The dendrogram of the clustering is shown in FIG. 2. Visual inspection of the dendrogram suggested the existence of 2-7 major clusters in the data.

Step 6. The gNMF algorithm was used to classify the tumor and cell line CGH data, using cluster numbers in the range of 2-7. With each cluster number, the gNMF algorithm was run 200 times using the stop criterion we developed. Classification models were then derived by hierarchical clustering on 1 minus the average of correlation matrix of H.

Step 7. BIC for the gNMF model was fitted in step 6. The results are listed in Table 2, where r denotes the number of clusters in each model. From Table 2, the inventors found that the model with 6 clusters had the smallest BIC. The heatmap of the gNMF output with 6 clusters is shown in FIG. 3.

TABLE 2 BIC for models using different cluster numbers r BIC 2 72202 3 67964 4 68822 5 61743 6 51893 7 63302

The 80 mM tumor samples were classified into 6 subgroups based on their pattern of copy number alterations, and cell lines were assigned to appropriate subgroups. The numbers of tumor samples and the identities of cell lines for each cluster are listed in Table 3.

Table 3. The numbers of MM tumors and the identities of cell lines in each subgroup of MM.

TABLE 3 Numbers of MM tumors and the identities of cell lines in each subgroup of MM Clusters Number of tumors Cell Lines Cluster A 15 SKMEL119, HS944, WM1366, WM88 Cluster B 12 WM3248 Cluster C 14 1205LU Cluster D 4 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, WM983C Cluster E 25 WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, 501MEL Cluster F 10 MALME3M, WM882

Step 8. The 10-fold stability test was applied to the gNMF model with 4 clusters. The 10-fold test of clustering stability. The error rate was 26.42%. As a comparison, the hierarchical clustering dendrogram derived using the smoothed copy number data in step 5 was cut into 2-7 clusters, and the stability of the clusters was tested using the same 10-fold test. The error rates were 17.94%-32.14%.

The six groups defined by the clustering procedure carried distinct patterns genomic aberrations, implying different origins, tumorigenic mechanisms and suggesting that they will manifest distinct clinical behaviour and sensitivity to therapeutic interventions, characteristic of each subgroup.

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1. A method for obtaining a database of malignant melanoma genomic subgroups, the method comprising the steps of: (a) obtaining a plurality of m samples comprising at least one MM cell; (b) acquiring a data set comprising copy number alteration information from at least one locus from each chromosome from each sample obtained in step (a); (c) identifying in the data set samples contaminated by normal cells and eliminating the contaminated samples from the data set, wherein the identifying and eliminating comprises: (1) applying a machine learning algorithm tuned to parameters that represent the differences between tumor and normal samples to the data; (2) assigning a probability score for normal cell contamination to each sample as determined by the machine learning algorithm; (3) eliminating data from the data set for each sample scoring 50% or greater probability of containing normal cells; (d) estimating a number of subgroups, r, in the data set by applying an unsupervised clustering algorithm using Pearson linear dissimilarity algorithm to the data set; (e) assigning each sample in the data set to at least one cluster using a modified genomic Non-negative Matrix Factorization (gNMF) algorithm, wherein the modified gNMF algorithm comprises: (1) calculating divergence of the algorithm after every 100 steps of multiplicative updating using the formula: $\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \; \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$ wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set; (2) stopping the algorithm if the divergence calculated in step (e) (1) does not decrease by more than about 0.001% when compared to the divergence calculated for the previous 100 steps of multiplicative updating of the algorithm; (3) randomly repeating the algorithm for a selected number of runs and calculating a Pearson correlation coefficient matrix of H for the each of run the algorithm using the formula: $\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{S_{H_{,i}}S_{H_{,j}}}}} & (12) \end{matrix}$ wherein C is a correlation matrix, C_(i,j) is an row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j), i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (d); (4) averaging the Pearson correlation coefficient matrices for each run of the algorithm obtained from step (e)(3) to arrive at an average correlation matrix; (5) assigning tumors and cell lines in the data set into r subgroups by applying a unsupervised clustering algorithm using 1 minus the average correlation matrix determined in step (e)(4) and cutting the dendrogram into r clusters; (f) applying a Cophenetic correlation, Bayesian Information Criterion or a combination thereof to provide a final number of clusters from the data set, wherein each final cluster defines a genomic subgroup for each tumor or cancer cell line sample; and (g) optionally evaluating the stability of the final number of clusters selected in step (f) using a ten-fold stability test.
 2. A method of classifying a MM tumor or cell line, comprising: (a) providing a database, developed through a method comprising: (i) obtaining a plurality of m samples comprising at least one MM tumor or cell line; (ii) acquiring a first data set comprising copy number alteration information from at least one locus from each chromosome from each sample obtained in step (i); (iii) identifying in the first data set samples contaminated by normal cells and eliminating the contaminated samples from the first data set, wherein the identifying and eliminating comprises: (1) applying a machine learning algorithm tuned to parameters that represent the differences between tumor and normal samples to the data; (2) assigning a probability score for normal cell contamination to each sample as determined by the machine learning algorithm; (3) eliminating data from the first data set for each sample scoring 50% or greater probability of containing normal cells; (iv) estimating a number of subgroups, r, in the data set by applying an unsupervised clustering algorithm using Pearson linear dissimilarity algorithm to the data set; (v) assigning each sample in the data set to at least one cluster using a modified genomic Non-negative Matrix Factorization (gNMF) algorithm, wherein the modified gNMF algorithm comprises: (1) calculating divergence of the algorithm after every 100 steps of multiplicative updating using the formula: $\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \; \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$ wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set; (2) stopping the algorithm if the divergence calculated in step (v) (1) does not decrease by more than about 0.001% when compared to the divergence calculated for the previous 100 steps of multiplicative updating of the algorithm; (3) randomly repeating the algorithm for a selected number of runs and calculating a Pearson correlation coefficient matrix of H for each of run the algorithm using the formula: $\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{S_{H_{,i}}S_{H_{,j}}}}} & (12) \end{matrix}$ wherein C is a correlation matrix, C_(i,j) is an row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j),i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv); (4) averaging the Pearson correlation coefficient matrices for each run of the algorithm obtained from step (v)(3) to arrive at an average correlation matrix; (5) assigning tumors and cell lines in the data set into r subgroups by applying a unsupervised clustering algorithm using 1 minus the average correlation matrix determined in step (v)(4) and cutting the dendrogram into r clusters; (vi) applying a Cophenetic correlation, Bayesian Information Criterion or a combination thereof to provide a final number of clusters from the data set, wherein each final cluster defines a genomic subgroup for each tumor or cancer cell line sample; and (vii) optionally evaluating the stability of the final number of clusters selected in step (vi) using a ten-fold stability test. (b) providing a sample suspected of containing MM cells, (c) acquiring a second data set, Vsample, comprising copy number alteration information from the same at least one locus from step (ii); and (d) classifying the sample from Vsample, by comparing Vsample to the clusters determined in steps (i)-(vii).
 3. The method of claim 1 or 2, wherein the unsupervised clustering algorithm is a hierarchical clustering.
 4. The method of claim 1 or 2, wherein Cophenetic correlation is used to provide a final number of clusters from the data set.
 5. The method of claim 1 or 2, wherein Bayesian Information Criterion is used to provide a final number of clusters from the data set.
 6. The method of claim 1 or 2, wherein Cophenetic correlation and Bayesian Information Criterion are used to provide a final number of clusters from the data set.
 7. The method of claim 1 or 2, wherein the plurality of samples, m, comprises a first, second, third, fourth, fifth and sixth cell lines, wherein the first cell line is selected from the group consisting of SKMEL119, HS944, WM1366, and WM88; the second cell line is WM3248; the third cell line is 1205LU; the fourth cell line is selected from the group consisting of 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, and WM983C; the fifth cell line is selected from the group consisting of WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, and 501MEL, and the sixth cell line is MALME3M or WM882.
 8. The method of claim 1 or 2, wherein the plurality of samples, m, consists of SKMEL119, HS944, WM1366, WM88; WM3248; 1205LU; 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63; WM35, WM983, WM983C, WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, 501MEL, MALME3M and WM882.
 9. A method of classifying a therapeutic intervention for arresting or killing malignant melanoma (MM) cells, comprising: (a) from a panel of MM cells classified according to genomic subgroups, selecting at least one MM cell line from each subgroup, wherein the panel is assembled from a method comprising: (i) obtaining a plurality of m samples comprising MM cells; (ii) acquiring a first data set comprising copy number alteration information from at least one locus from each chromosome from each sample obtained in step (i); (iii) identifying in the first data set samples contaminated by normal cells and eliminating the contaminated samples from the first data set, wherein the identifying and eliminating comprises: (1) applying a machine learning algorithm tuned to parameters that represent the differences between tumor and normal samples to the data; (2) assigning a probability score for normal cell contamination to each sample as determined by the machine learning algorithm; (3) eliminating data from the first data set for each sample scoring 50% or greater probability of containing normal cells; (iv) estimating a number of subgroups, r, in the data set by applying an unsupervised clustering algorithm using Pearson linear dissimilarity algorithm to the data set; (v) assigning each sample in the data set to at least one cluster using a modified genomic Non-negative Matrix Factorization (gNMF) algorithm, wherein the modified gNMF algorithm comprises: (1) calculating divergence of the algorithm after every 100 steps of multiplicative updating using the formula: $\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \; \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$ wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set; (2) stopping the algorithm if the divergence calculated in step (v) (1) does not decrease by more than about 0.001% when compared to the divergence calculated for the previous 100 steps of multiplicative updating of the algorithm; (3) randomly repeating the algorithm for a selected number of runs and calculating a Pearson correlation coefficient matrix of H for the each of run the algorithm using the formula: $\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{S_{H_{,i}}S_{H_{,j}}}}} & (12) \end{matrix}$ wherein C is a correlation matrix, C_(i,j) is an i^(th) row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j), i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv); (4) averaging the Pearson correlation coefficient matrices for each run of the algorithm obtained from step (v)(3) to arrive at an average correlation matrix; (5) assigning the samples in the data set into r subgroups by applying a unsupervised clustering algorithm using 1 minus the average correlation matrix determined in step (v)(4) and cutting the dendrogram into r clusters; (vi) applying a Cophenetic correlation, Bayesian Information Criterion or a combination thereof to provide a final number of clusters from the data set, wherein each final cluster defines a genomic subgroup for each sample; and (vii) optionally evaluating the stability of the final number of clusters selected in step (vi) using a ten-fold stability test; (viii) selecting at least one MM cell from each cluster selected in step (vi) and assembling into panels defined according to genomic subgroups. (b) contacting the at least one MM cell from each subgroup with the therapeutic intervention; (c) assaying the effectiveness of the therapeutic intervention to arrest or kill the at least one MM cell from each subgroup; (d) classifying the therapeutic intervention according to the determined effectiveness of the therapeutic intervention to arrest or kill the at least one MM cell from each subgroup, wherein arresting or killing the at least one MM cell from one subgroup, but not another indicates specificity of the therapeutic intervention to arrest or kill MM cells of that subgroup.
 10. The method of claim 9, wherein the unsupervised clustering algorithm is a hierarchical clustering.
 11. The method of claim 9, wherein Cophenetic correlation is used to provide a final number of clusters from the data set.
 12. The method of claim 9, wherein Bayesian Information Criterion is used to provide a final number of clusters from the data set.
 13. The method of claim 9, wherein Cophenetic correlation and Bayesian Information Criterion are used to provide a final number of clusters from the data set.
 14. The method of claim 9, wherein the MM cells are from a cell line.
 15. The method of claim 9, wherein the plurality of samples, m, comprises a first, second, third, fourth, fifth and sixth cell line, wherein the first cell line is selected from the group consisting of SKMEL119, HS944, WM1366, and WM88; the second cell line is WM3248; the third cell line is 1205LU; the fourth cell line is selected from the group consisting of 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, and WM983C; the fifth cell line is selected from the group consisting of WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, and 501MEL, and the sixth cell lines is MALME3M or WM882.
 16. The method of claim 9, wherein the plurality of samples, m, consists of SKMEL119, HS944, WM1366, WM88; WM3248; 1205LU; 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63; WM35, WM983, WM983C, WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, 501MEL, MALME3M and WM882.
 17. The method of claim 9, wherein the therapeutic intervention comprises chemotherapy, biological response modifiers, vaccine immunotherapy, or biochemotherapy.
 18. The method of claim 17, wherein the therapeutic intervention is a biological response modifier, and the biological response modifier comprises administering at least one pharmaceutical composition comprising an active agent selected from the group consisting of interferon, interleukin-2, monoclonal antibodies, and tumor necrosis factor-alpha.
 19. The method of claim 18, wherein the biological response modifier comprises administering two or more active agents.
 20. A method of assembling a probe panel for classifying a MM cell from a sample, comprising: (a) assembling a database, comprising: (i) obtaining a plurality of m samples comprising at least one MM cell; (ii) acquiring a first data set comprising copy number alteration information from at least one locus from each chromosome from each sample obtained in step (i); (iii) identifying in the first data set samples contaminated by normal cells and eliminating the contaminated samples from the first data set, wherein the identifying and eliminating comprises: (1) applying a machine learning algorithm tuned to parameters that represent the differences between tumor and normal samples to the data; (2) assigning a probability score for normal cell contamination to each sample as determined by the machine learning algorithm; (3) eliminating data from the first data set for each sample scoring 50% or greater probability of containing normal cells; (iv) estimating a number of subgroups, r, in the data set by applying an unsupervised clustering algorithm using Pearson linear dissimilarity algorithm to the data set; (v) assigning each sample in the data set to at least one cluster using a modified genomic Non-negative Matrix Factorization (gNMF) algorithm, wherein the modified gNMF algorithm comprises: (1) calculating divergence of the algorithm after every 100 steps of multiplicative updating using the formula: $\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \; \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$ wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set; (2) stopping the algorithm if the divergence calculated in step (v) (1) does not decrease by more than about 0.001% when compared to the divergence calculated for the previous 100 steps of multiplicative updating of the algorithm; (3) randomly repeating the algorithm for a selected number of runs and calculating a Pearson correlation coefficient matrix of H for the each of run the algorithm using the formula: $\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{S_{H_{,i}}S_{H_{,j}}}}} & (12) \end{matrix}$ wherein C is a correlation matrix, C_(i,j) is an row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j),i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv); (4) averaging the Pearson correlation coefficient matrices for each run of the algorithm obtained from step (v)(3) to arrive at an average correlation matrix; (5) assigning tumors and cell lines in the data set into r subgroups by applying a unsupervised clustering algorithm using 1 minus the average correlation matrix determined in step (v)(4) and cutting the dendrogram into r clusters; (vi) applying a Cophenetic correlation, Bayesian Information Criterion or a combination thereof to provide a final number of clusters from the data set, wherein each final cluster defines a genomic subgroup for each tumor or cancer cell line sample; and (vii) optionally evaluating the stability of the final number of clusters selected in step (vi) using a ten-fold stability test. (viii) selecting at least one sample from each cluster selected in step (vi) and assembling into panels defined according to genomic subgroups; (b) analyzing the database of step (a) to determine characteristic copy number abnormalities for each subgroup; (c) designing a plurality of probes based on the determined characteristic copy number abnormalities for each subgroup and assigning each probe to a genomic subgroup.
 21. A kit comprising the probe panel of claim
 20. 22. The kit of claim 21, wherein each probe is a FISH probe.
 23. A kit for classifying a MM tumor sample or a cell line, comprising: (a) instructions to assemble a database, comprising instructions for: (i) obtaining a plurality of m samples comprising at least one MM cell; (ii) acquiring a first data set comprising copy number alteration information from at least one locus from each chromosome from each sample obtained in step (i); (iii) identifying in the first data set samples contaminated by normal cells and eliminating the contaminated samples from the first data set, wherein the identifying and eliminating comprises: (1) applying a machine learning algorithm tuned to parameters that represent the differences between tumor and normal samples to the data; (2) assigning a probability score for normal cell contamination to each sample as determined by the machine learning algorithm; (3) eliminating data from the first data set for each sample scoring 50% or greater probability of containing normal cells; (iv) estimating a number of subgroups, r, in the data set by applying an unsupervised clustering algorithm using Pearson linear dissimilarity algorithm to the data set; (v) assigning each sample in the data set to at least one cluster using a modified genomic Non-negative Matrix Factorization (gNMF) algorithm, wherein the modified gNMF algorithm comprises: (1) calculating divergence of the algorithm after every 100 steps of multiplicative updating using the formula: $\begin{matrix} {{D\left( {V{}{WH}} \right)} = {\sum\limits_{i = 1}^{n}{\sum\limits_{j = 1}^{m}\left( {{V_{ij}\log \; \frac{V_{ij}}{({WH})_{ij}}} - V_{ij} + ({WH})_{ij}} \right)}}} & (11) \end{matrix}$ wherein the V_(ij) is the i^(th) row and j^(th) column of matrix V, (WH)_(ij) is the i^(th) row and j^(th) column of matrix (W*H), i runs from 1 to n and n is the number of segments in the data set, and j runs from 1 to m and m is the number of samples in the data set; (2) stopping the algorithm if the divergence calculated in step (v) (1) does not decrease by more than about 0.001% when compared to the divergence calculated for the previous 100 steps of multiplicative updating of the algorithm; (3) randomly repeating the algorithm for a selected number of runs and calculating a Pearson correlation coefficient matrix of H for the each of run the algorithm using the formula: $\begin{matrix} {C_{i,j} = {{\rho \left( {H_{,i},H_{,j}} \right)} = \frac{\frac{1}{r - 1}{\sum\limits_{k}{\left( {H_{k,i} - {\overset{\_}{H}}_{,i}} \right)\left( {H_{k,j} - {\overset{\_}{H}}_{,j}} \right)}}}{S_{H_{,i}}S_{H_{,j}}}}} & (12) \end{matrix}$ wherein C is a correlation matrix, C_(i,j) is an i^(th) row and j^(th) column in matrix C, H_(,i) and H_(,j) are an i^(th) and j^(th) column vector in matrix H, ρ(H_(,i), H_(,j)) is a Pearson correlation coefficient between H_(,i) and H_(,j), i and j run from 1 to m, m is the number of samples in the data set, k runs from 1 to r, and r is the number of subgroups from step (iv); (4) averaging the Pearson correlation coefficient matrices for each run of the algorithm obtained from step (v)(3) to arrive at an average correlation matrix; (5) assigning tumors and cell lines in the data set into r subgroups by applying a unsupervised clustering algorithm using 1 minus the average correlation matrix determined in step (v)(4) and cutting the dendrogram into r clusters; (vi) applying a Cophenetic correlation, Bayesian Information Criterion or a combination thereof to provide a final number of clusters from the data set, wherein each final cluster defines a genomic subgroup for each tumor or cancer cell line sample; and (vii) optionally evaluating the stability of the final number of clusters selected in step; and (vi) using an ten-fold stability test; and (b) optionally, a first, second, third, fourth, fifth and sixth cell lines, or isolated genomic DNA thereof, wherein the first cell line is selected from the group consisting of SKMEL119, HS944, WM1366, and WM88; the second cell line is WM3248; the third cell line is 1205LU; the fourth cell line is selected from the group consisting of 451LU, SKMEL19, SKMEL28, SKMEL30, SKMEL63, WM35, WM983, and WM983C; the fifth cell line is selected from the group consisting of WM3211, M14, MEWO, SKMEL2, SKMEL5, UACC257, UACC62, WM122, WM13662, WM239A, WM32112, WM32482, WM793B, and 501MEL, and the sixth cell line is MALME3M or WM882. 